Transcript Machines
PHYSICS Principles and Problems Chapter 10: Work, Energy, and Machines CHAPTER 10 Work, Energy, and Machines BIG IDEA Doing work on a system changes the system’s energy. CHAPTER 10 Table Of Contents Section 10.1 Energy and Work Section 10.2 Machines Click a hyperlink to view the corresponding slides. Exit SECTION Energy and Work 10.1 MAIN IDEA Work is the transfer of energy that occurs when a force is applied through a displacement. Essential Questions • What is work? • What is energy? • How are work and energy related? • What is power, and how is it related to work and energy? SECTION Energy and Work 10.1 Review Vocabulary • Law of conservation of momentum states that the momentum of any closed, isolated system does not change New Vocabulary • Work – the transfer of energy that occurs when a force is applied through a displacement. • Joule – the SI unit of work and energy • Energy – the ability of a system to produce change in itself or the world around it SECTION 10.1 Energy and Work New Vocabulary • Work-energy theorem – states that when work is done on a system, the result is a change in the system’s energy • Kinetic energy – the energy associated with motion • Translational kinetic energy – energy due to the motion of a system’s center of mass • Power – the rate at which energy is transformed • Watt – 1 J of energy transferred or transformed in 1 s; the unit of power SECTION 10.1 Energy and Work Work (cont.) • A force, F, was exerted on an object while the object moved a distance, d, as shown in the figure. • If F is a constant force, exerted in the direction in which the object is moving, then work, W, is the product of the force and the object’s displacement. SECTION 10.1 Energy and Work Work (cont.) • Work is equal to a constant force exerted on an object in the direction of motion, multiplied by the object’s displacement. W = Fd • The SI unit of work is called a joule. One joule is equal to 1N•m. SECTION 10.1 Energy and Work Work (cont.) • The equation W = Fd holds true only for constant forces exerted in the direction of motion. • An everyday example of a force exerted perpendicular to the direction of motion is the motion of a planet around the Sun, as shown in the figure. • If the orbit is circular, then the force is always perpendicular to the direction of motion. SECTION 10.1 Energy and Work Work (cont.) Click image to view movie. SECTION Energy and Work 10.1 Work (cont.) •When a force is applied angle causes an object to move horizontally, only the horizontal component of the force does work. The equation for work when force is applied at an angle: W=Fdcosθ SECTION Energy and Work 10.1 Work (cont.) Get it? Determine the work you do when you exert a force of 3N at an angle of 45° from the direction of motion for 1 m. • W = Fdcosθ = (3)(1)cos(45) SECTION 10.1 Energy and Work Work (cont.) • Other agents exert forces on the pushed car as well. • Earth’s gravity acts downward, the ground exerts a normal force upward, and friction exerts a horizontal force opposite the direction of motion. SECTION 10.1 Energy and Work Work (cont.) • The upward and downward forces are perpendicular to the direction of motion and do no work. For these forces, θ = 90°, which makes cos θ = 0, and thus, W = 0. SECTION Energy and Work 10.1 Work (cont.) • Draw a force diagram showing the force you exert (Fme) to the right on a box and the force your friend exerts (Ffriend) to the left on the box. As a result of these two forces, the box moves to the right. Also show the gravitational force and the normal force. Explain why some forces do not work on the box. Fn Ffriend Fme Fgravity •The normal force and gravity do no work on the box because they are not along the direction of the box’s motion. SECTION 10.1 Energy and Work Work (cont.) • It is important to consider all the forces acting on an object separately. Consider you are pushing a box on a frictionless surface while your friend is trying to prevent you from moving it. • What forces are acting on the box and how much work is being done? SECTION 10.1 Energy and Work Work (cont.) • The force you exert (Fon box by you) is the direction of the displacement, so the work you do is: W = Fon box by youd • Your friend exerts a force (Fon box by friend) in the direction opposite the displacement (θ = 180°). Because cos 180° = -1, your friend does negative work: W = - Fon box by friendd SECTION Energy and Work 10.1 Work (cont.) • Get it? Explain why you do positive work on the box and your friend does negative work on the box. – You do positive work because your force is exerted in the direction of displacement – Your friend does negative work because the force applied is in the direction opposite of displacement. SECTION Energy and Work 10.1 Work (cont.) • The total work done on a system is the sum of the work done by each agent that exerts a force on the system. • The total work done on the box would be: W = Fon box by youd - Fon box by friendd W = 3 – 1.5 = 1.5J SECTION Energy and Work 10.1 Work (cont.) • Get it? Describe another scenario in which you do work on a system, and explain how much work is done on the system. •Suppose you pull straight up on a fishing line that has bait and a sinker attached. If the bait, fishing line, and sinker have a mass of 0.15 N and you pull it straight up 8.0m, you do 1.2 J of work. •W = Fdcosθ = (.15)(8)cos(90) = 1.2 J SECTION 10.1 Energy and Work Work (cont.) • A graph of force versus displacement lets you determine the work done by a force. This graphical method can be used to solve problems in which the force is changing. •The work can be found by finding the area of the graph. SECTION 10.1 Energy and Work Work (cont.) • The adjoining figure shows the work done by a constant force of 20.0 N that is exerted to lift an object a distance of 1.50 m. • The work done by this constant force is represented by W = Fd = (20.0 N)(1.50 m) = 30.0 J. SECTION 10.1 Energy and Work Work (cont.) • This figure shows the force exerted by a spring, which varies linearly from 0.0 N to 20.0 N as it is compressed 1.50 m. • The work done by the force that increases linearly (compressed the spring) is the area under the graph, which is the area of a triangle, ½ (base) (altitude), or W = ½ (20.0 N)(1.50 m) = 15.0 J. SECTION 10.1 Energy and Work Work (example.) • An ice skater slides toward a sled sitting on the ice and hits against it. The skater exerts a 12.6 N force on the sled at an angle of 15.3° below the horizontal. The sled them moves 15.4 m forward. How much work did the skater do on the sled? Assume friction is negligible. 1. Analyze and sketch the problem: Known: F = 12.6 N Unknowns: W = ? d = 15.4 m θ = 15.3° SECTION 10.1 Energy and Work Work (example.) • What is the system? The sled • What is the force that is doing work on the system? The skater’s push 2. Solve for the unknown W = Fdcosθ = (12.6)(15.4)cos(15.3) = 187 J SECTION 10.1 Energy and Work Work (example.) 3. Evaluate the answer Explain why your units for work are correct: The unit for work is joules, and a newton-meter is equal to a joule. Explain why the sign of the answer is correct: The skater does work on the sled, and the work should be the same direction as the force. SECTION 10.1 Energy and Work Energy (cont.) • The work-energy theorem states that when work is done on a system, the result is a change in the system’s energy. • This theorem can be represented by the following equation: SECTION Energy and Work 10.1 Energy (cont.) Give an example of a force that does work on a system. Then use the work-energy theorem to your example. •Ex: If a soccer player kicks a ball, the player’s foot does work on the ball. According to the work-energy theorem, work done on a system is equal to the change in the system’s energy. Therefore, the change in the ball’s energy is equal to the amount of work that the player’s foot does on the ball. SECTION 10.1 Energy and Work Energy (cont.) • The ability of an object to produce a change in itself or the world around it is called energy and is represented by the symbol E. SECTION 10.1 Energy and Work Energy (cont.) • Write a sentence using the word energy with its science usage and a sentence using the word energy with its common usage. • Science ex: The energy of a train changes as the force from the engine increases the train’s speed. • Common ex: The little children had so much energy that they ran and played all afternoon. SECTION Energy and Work 10.1 Energy (cont.) • Since work is measured in joules, energy must also be measured in joules. • Through the process of doing work, energy can move between the external world and the system. – If the external world does work on the system, then W is positive and the energy of the system increases. – If the system does work on the external world, then W is negative and the energy of the system decreases. SECTION 10.1 Energy and Work Energy (cont.) • The energy resulting from motion is called kinetic energy and is represented by the symbol KE. • In the examples we have considered, the object was changing position and its energy, , was due to its motion. SECTION 10.1 Energy and Work Energy (cont.) • Energy due to changing position is called translational kinetic energy and can be represented by the following equation: SECTION Energy and Work 10.1 Power • Suppose you had a stack of books to move from the floor to a shelf. – You could lift the entire stack at once. – Or you could move the books one at a time. • How would the amount of work compare between the two cases? SECTION 10.1 Energy and Work Power (cont.) • In both cases, the total force applied and the displacement are the same so the work is the same. However, the time needed is different. • Recall, that work causes a change in energy. The rate at which energy is transformed is power. SECTION 10.1 Energy and Work Power (cont.) • Power is the work done, divided by the time taken to do the work. • In other words, power is the rate at which the external force changes the energy of the system. It is represented by the following equation. SECTION 10.1 Energy and Work Power (cont.) • Consider two forklifts, both using the same amount of force to lift identical loads. One accomplishes the task in 5 seconds, the other in 10 seconds. • Even though the same work is accomplished by both, the forklift that took less time, has more power. SECTION 10.1 Energy and Work Power (cont.) • Power is measured in watts (W). One watt is 1 Joule of energy transferred in 1 second. • A watt is a relatively small unit of power. For example, a glass of water weighs about 2 N. If you lift the glass 0.5 m in 1 s, you are doing work at the rate of 1 W. • Because a watt is such a small unit, power often is measured in kilowatts (kW). One kilowatt is equal to 1000 W. SECTION 10.1 Energy and Work Power (cont.) • When force and displacement are in the same direction, P = Fd/t. However, because the ratio d/t is the speed, power also can be calculated using P = Fv. • When riding a multi-speed bicycle, you need to choose the correct gear. By considering the equation, P = Fv, you can see that either zero force or zero speed results in no power delivered. SECTION 10.1 Energy and Work Power (cont.) • The muscles cannot exert extremely large forces, nor can they move very fast. Thus, some combination of moderate force and moderate speed will produce the largest amount of power. SECTION 10.1 Energy and Work Power (cont.) • The adjoining animation shows that the maximum power output is over 1000 W when the force is about 400 N and speed is about 2.6 m/s. • All engines—not just humans—have these limitations. SECTION 10.1 Section Check If a constant force of 10 N is applied perpendicular to the direction of motion of a ball, moving at a constant speed of 2 m/s, what will be the work done on the ball? A. 20 J B. 0 J C. 10 J D. Data insufficient SECTION 10.1 Section Check Answer Reason: Work is equal to a constant force exerted on an object in the direction of motion, times the object’s displacement. Since the force is applied perpendicular to the direction of motion, the work done on the ball would be zero. SECTION 10.1 Section Check Three friends, Brian, Robert, and David, participated in a 200-m race. Brian exerted a force of 240 N and ran with an average velocity of 5.0 m/s, Robert exerted a force of 300 N and ran with an average velocity of 4.0 m/s, and David exerted a force of 200 N and ran with an average velocity of 6.0 m/s. Whom amongst the three delivered the most power? SECTION 10.1 Section Check A. Brian B. Robert C. David D. All three delivered the same power SECTION Section Check 10.1 Answer Reason: The equation of power in terms of work done is: P = W/t Also since W = Fd P = Fd/t Also d/t = v P = Fv SECTION 10.1 Section Check Answer Now, since the product of force and velocity was the same for all three participants: Power delivered by Brian P = (240 N) (5.0 m/s) = 1.2 kW Power delivered by Robert P = (300 N) (4.0 m/s) = 1.2 kW Power delivered by David P = (200 N) (6.0 m/s) = 1.2 kW All three players delivered the same power. SECTION 10.1 Section Check A graph of the force exerted by an athlete versus the velocity with which he ran in a 200-m race is given at right. What can you conclude about the power produced by the athlete? SECTION 10.1 Section Check The options are: A. As the athlete exerts more and more force, the power decreases. B. As the athlete exerts more and more force, the power increases. C. As the athlete exerts more and more force, the power increases to a certain limit and then decreases. D. As the athlete exerts more and more force, the power decreases to a certain limit and then increases. SECTION 10.1 Section Check Answer Reason: From the graph, we can see that as the velocity of the athlete increases, the force exerted by the athlete decreases. Power is the product of velocity and force. Thus, some combination of moderate force and moderate speed will produce the maximum power. SECTION 10.1 Section Check Answer Reason: This can be understood by looking at the graph. SECTION 10.1 Section Check Answer By considering the equation P = Fv, we can see that either zero force or zero speed results in no power delivered. The muscles of the athlete cannot exert extremely large forces, nor can they move very fast. Hence, as the athlete exerts more and more force, the power increases to a certain limit and then decreases. SECTION Machines 10.2 MAIN IDEA Machines make tasks easier by changing the magnitude or the direction of the force exerted. Essential Questions • What is a machine, and how does it make tasks easier? • How are mechanical advantage, the effort force and the resistance force related? • What is a machine’s ideal mechanical advantage? • What does the term efficiency mean? SECTION Machines 10.2 Review Vocabulary • work a force applied through a distance New Vocabulary • • • • • • • Machine – a device that makes tasks easier by changing either the magnitude or the direction of the applied force. Effort force – force exerted by a user on a machine Resistance force – force exerted by the machine Mechanical advantage – ratio of resistance force to effort force Ideal mechanical advantage – equal to the displacement of the effort force divided by the displacement of the resistance force Efficiency – the ratio of output work to input work Compound machine – machine consisting of two or more simple machines linked in such a way that the resistance force of one machine becomes the effort force of the second. SECTION 10.2 Machines Machines • Everyone uses machines every day. Some are simple tools, such as bottle openers and screwdrivers, while others are complex, such as bicycles and automobiles. • Machines, whether powered by engines or people, make tasks easier. • A machine is a device that makes tasks easier by changing either the magnitude or the direction of a force to match the force. SECTION Machines 10.2 Machines (cont.) Click image to view movie. SECTION 10.2 Machines Machines (cont.) • In a fixed pulley, such as the one shown in the figure here, the forces, Fe and Fr, are equal, and consequently MA is 1. • The fixed pulley is useful, not because the effort force is lessened, but because the direction of the effort force is changed. SECTION 10.2 Machines Machines (cont.) • An effort force is exerted by a user on a machine • A resistance force is exerted by a machine. SECTION 10.2 Machines Machines (cont.) • Many machines, such as the pulley system shown in the figure, have a mechanical advantage greater than 1. • When the mechanical advantage is greater than 1, the machine increases the force applied by a person. SECTION Machines 10.2 Machines (cont.) • Get it? Calcuate: A machine has a mechanical advantage of 3. If the input force is 2N, what is the output force? 2 x 3 = 6N (output force) SECTION 10.2 Machines Machines (cont.) • A machine can increase force, but it cannot increase energy. An ideal machine transfers all the energy, so the output work equals the input work: Wo = Wi or Frdr = Fede. • This equation can be rewritten as Fr /Fe = de/dr. (Resistance force/ effort force) = (displacement of effort force/ displacement of resistance force) SECTION 10.2 Machines Machines (cont.) • Therefore, for an ideal machine, ideal mechanical advantage, IMA, is equal to the displacement of the effort force, divided by the displacement of the load. • The ideal mechanical advantage can be represented by the following equation. SECTION 10.2 Machines Machines (cont.) • In a real machine, not all of the input work is available as output work. Energy removed from the system means that there is less output work from the machine. • Consequently, the machine is less efficient at accomplishing the task. SECTION 10.2 Machines Machines (cont.) • The efficiency of a machine, e, is defined as the ratio of output work to input work. • The efficiency of a machine (in %) is equal to the output work, divided by the input work, multiplied by 100. SECTION 10.2 Machines Machines (cont.) • An ideal machine has equal output and input work, Wo/Wi = 1, and its efficiency is 100 percent. All real machines have efficiencies of less than 100 percent because some energy is always lost through heat or sound, not all of the input work is available as output work. • Efficiency can be expressed in terms of the mechanical advantage and ideal mechanical advantage. SECTION 10.2 Machines Machines (cont.) • Efficiency, e = Wo/Wi, can be rewritten as follows: SECTION 10.2 Machines Machines (cont.) • Because MA = Fr/Fe and IMA = de/dr, the following expression can be written for efficiency. • The efficiency of a machine (in %) is equal to its mechanical advantage, divided by the ideal mechanical advantage, multiplied by 100. SECTION 10.2 Machines Machines (cont.) • A machine’s design determines its ideal mechanical advantage. An efficient machine has an MA almost equal to its IMA. A less-efficient machine has a small MA relative to its IMA. • To obtain the same resistance force, a greater force must be exerted in a machine of lower efficiency than in a machine of higher efficiency. SECTION 10.2 Machines Compound Machines • Most machines, no matter how complex, are combinations of one or more of the six simple machines: the lever, pulley, wheel and axle, inclined plane, wedge, and screw. These machines are shown in the figure. • Both are designed to make a task easier. SECTION 10.2 Machines Compound Machines (cont.) • The IMA of all compound machines is the ratio of the displacement of the effort force to the displacement of the resistance force. • For machines, such as the lever and the wheel and axle, this ratio can be replaced by the ratio of the displacements between the place where the force is applied and the pivot point. SECTION 10.2 Machines Compound Machines (cont.) • A common version of the wheel and axle is a steering wheel, such as the one shown in the figure at right. The IMA is the ratio of the radii of the wheel and axle. SECTION 10.2 Machines Compound Machines (cont.) • A machine consisting of two or more simple machines linked in such a way that the resistance force of one machine becomes the effort force of the second is called a compound machine. SECTION 10.2 Machines Compound Machines (cont.) • In a bicycle, the pedal and the front gear act like a wheel and axle. The effort force is the force that the rider exerts on the pedal, Frider on pedal. • The resistance is the force that the front gear exerts on the chain, Fgear on chain. SECTION 10.2 Machines Compound Machines (cont.) • The chain exerts an effort force on the rear gear, Fchain on gear, equal to the force exerted on the chain. • The resistance force is the force that the wheel exerts on the road, Fwheel on road. SECTION 10.2 Machines Compound Machines (cont.) • According to Newton’s third law, the ground exerts an equal forward force on the wheel, which accelerates the bicycle forward. • The MA of a compound machine is the product of the MAs of the simple machines from which it is made. SECTION 10.2 Machines Compound Machines (cont.) • So for a simple machine, the mechanical advantage is the ratio of the resistance force and the effort force. For a compound machine, the mechanical advantage is found the same way for each individual machine, but the total mechanical advantage is the produce of the mechanical advantage for each individual machine. SECTION 10.2 Machines Compound Machines (cont.) • In the case of the bicycle, MA = MAmachine 1 × MAmachine 2. SECTION Machines 10.2 Compound Machines (cont.) • The IMA of each wheel-and-axle machine is the ratio of the distances moved. For the pedal gear, For the rear wheel, SECTION 10.2 Machines Compound Machines (cont.) • For the bicycle, then, SECTION 10.2 Machines Compound Machines (cont.) • Because both gears use the same chain and have teeth of the same size, you can count the number of teeth to find the IMA, as follows. SECTION 10.2 Machines Compound Machines (cont.) • Shifting gears on a bicycle is a way of adjusting the ratio of gear radii to obtain the desired IMA. • If the pedal of a bicycle is at the top or bottom of its circle, no matter how much downward force you exert, the pedal will not turn. SECTION 10.2 Machines Compound Machines (cont.) • The force of your foot is most effective when the force is exerted perpendicular to the arm of the pedal; that is, when the torque is largest. • Whenever a force on a pedal is specified, assume that it is applied perpendicular to the arm. SECTION 10.2 Machines Compound Machines (cont.) • Get it? Explain what are the unites of the MA and IMA for the bicycle? • Both are dimensionless quantities and have not units. SECTION 10.2 Machines Compound Machines (cont.) • On a multi-gear bicycle, the rider can change the MA of the machine by choosing the size of one or both gears. • When accelerating or climbing a hill, the rider increases the ideal mechanical advantage to increase the force that the wheel exerts on the road. SECTION 10.2 Machines Compound Machines (cont.) • To increase the IMA, the rider needs to make the rear gear radius large compared to the front gear radius. • For the same force exerted by the rider, a larger force is exerted by the wheel on the road. However, the rider must rotate the pedals through more turns for each revolution of the wheel. SECTION 10.2 Machines Compound Machines (cont.) • On the other hand, less force is needed to ride the bicycle at high speed on a level road. • An automobile transmission works in the same way. To accelerate a car from rest, large forces are needed and the transmission increases the IMA. SECTION 10.2 Machines Compound Machines (cont.) • At high speeds, however, the transmission reduces the IMA because smaller forces are needed. • Even though the speedometer shows a high speed, the tachometer indicates the engine’s low angular speed. SECTION Machines 10.2 Try it! • A 45.6 cm wheel is attached to an axle with a radius of 8.95 cm. When an effort force of 265 N turns the axle, the wheel moves a linear distance of 16.3 cm. The efficiency of the wheel and axle is 85.6 percent. – A. What is the IMA of the wheel and axle? – B. What is the MA of the wheel and axle? – C. What is the resistance force? – D. How far did the axle turn when the wheel moved 16.3cm? SECTION 10.2 Try it! Machines SECTION 10.2 Try it! Machines SECTION 10.2 Machines Try it! 3. Evaluate the answer Are the units correct? IMA and MA have no units. The force is in newtons, and the distance is in cm. SECTION 10.2 Machines Get it? Explain why your car needs multiple gears. Gears are needed to apply different amounts of forces for different requirements. SECTION 10.2 Machines The Human Walking Machine • Movement of the human body is explained by the same principles of force and work that describe all motion. • Simple machines, in the form of levers, give humans the ability to walk and run. The lever systems of the human body are complex. SECTION 10.2 Machines The Human Walking Machine (cont.) • However each system has the following four basic parts. 1. a rigid bar (bone) 2. source of force (muscle contraction) 3. a fulcrum or pivot (movable joints between bones) 4. a resistance (the weight of the body or an object being lifted or moved). SECTION 10.2 Machines The Human Walking Machine (cont.) • Lever systems of the body are not very efficient, and mechanical advantages are low. • This is why walking and jogging require energy (burn calories) and help people lose weight. SECTION 10.2 Machines The Human Walking Machine (cont.) • When a person walks, the hip acts as a fulcrum and moves through the arc of a circle, centered on the foot. • The center of mass of the body moves as a resistance around the fulcrum in the same arc. SECTION 10.2 Machines The Human Walking Machine (cont.) • The length of the radius of the circle is the length of the lever formed by the bones of the leg. SECTION 10.2 Machines The Human Walking Machine (cont.) • Athletes in walking races increase their velocity by swinging their hips upward to increase this radius. • A tall person’s body has lever systems with less mechanical advantage than a short person’s does. SECTION 10.2 Machines The Human Walking Machine (cont.) • Although tall people usually can walk faster than short people can, a tall person must apply a greater force to move the longer lever formed by the leg bones. • Walking races are usually 20 or 50 km long. Because of the inefficiency of their lever systems and the length of a walking race, very tall people rarely have the stamina to win. SECTION 10.2 Section Check How can a simple machine, such as a screwdriver, be used to turn a screw? SECTION 10.2 Section Check Answer You transfer energy to the screwdriver, which in turn transfers energy to the screw. SECTION 10.2 Section Check Answer Reason: When you use a screwdriver to turn a screw, you rotate the screwdriver, thereby doing work on the screwdriver. The screwdriver turns the screw, doing work on it. The work that you do is the input work, Wi. The work that the machine does is called output work, W0 . SECTION 10.2 Section Check Answer Reason: Recall that work is the transfer of energy by mechanical means. You put work into a machine, such as the screwdriver. That is, you transfer energy to the screwdriver. The screwdriver, in turn, does work on the screw, thereby transferring energy to it. SECTION 10.2 Section Check How can you differentiate between the efficiency of a real machine and an ideal machine? A. The efficiency of an ideal machine is 100%, whereas efficiency of a real machine can be more than 100%. B. The efficiency of a real machine is 100%, whereas efficiency of an ideal machine can be more than 100%. C. The efficiency of an ideal machine is 100%, whereas efficiency of a real machine is less than 100%. D. The efficiency of a real machine is 100%, whereas efficiency of an ideal machine is less than 100%. SECTION Section Check 10.2 Answer Reason: The efficiency of a machine (in percent) is equal to the output work, divided by the input work, multiplied by 100. Efficiency of a machine = For an ideal machine, Wo = Wi. Hence, efficiency of an ideal machine = 100%. For a real machine, Wi > Wo. Hence, efficiency of a real machine is less than 100%. SECTION 10.2 Section Check What is a compound machine? Explain how a series of simple machines combine to make a bicycle a compound machine. SECTION 10.2 Section Check Answer A compound machine consists of two or more simple machines linked in such a way that the resistance force of one machine becomes the effort force of the second machine. SECTION 10.2 Section Check Answer In a bicycle, the pedal and the front gear act like a wheel and an axle. The effort force is the force that the rider exerts on the pedal, Frider on pedal. The resistance force is the force that the front gear exerts on the chain, Fgear on chain. The chain exerts an effort force on the rear gear, Fchain on gear, equal to the force exerted on the chain by the gear. This gear and the rear wheel act like another wheel and axle. The resistance force here is the force that the wheel exerts on the road, Fwheel on road. CHAPTER 10 Energy, Work, and Simple Machines Resources Physics Online Study Guide Chapter Assessment Questions Standardized Test Practice SECTION Energy and Work 10.1 Study Guide • Work is done when a force is applied through a displacement. Work is the product of the force exerted on a system and the component of the distance through which the system moves that is parallel to the force. The work done can be determined by calculating the area under a force-displacement graph. SECTION Energy and Work 10.1 Study Guide • Energy is the ability of a system to produce a change in itself or its environment. A moving object has kinetic energy. Objects that are changing position have translational energy. SECTION Energy and Work 10.1 Study Guide • The work done on a system is equal to the change in energy of the system. This is called the work-energy theorem. • Power is the rate at which energy is transformed. When work causes the change in energy, power is equal to the rate of work done. SECTION Machines 10.2 Study Guide • Machines, whether powered by engines or humans, do not change the amount of work done, but they do make the task easier by changing the magnitude or direction of the effort force. SECTION Machines 10.2 Study Guide • The mechanical advantage, MA, is the ratio of resistance force to effort force. • The ideal mechanical advantage, IMA, is the ratio of the distances moved. SECTION Machines 10.2 Study Guide • The efficiency of a machine is the ratio of output work to input work. SECTION Machines 10.2 Study Guide • The efficiency of a machine can be found from the real and ideal mechanical advantages. In all real machines, MA is less than IMA, and e is less than 100 percent. CHAPTER 10 Work, Energy, and Machines Chapter Assessment Juan pulled a crate with a rope angled 25° above the horizontal, applying a constant force of 40 N over a distance of 100 m. Find the work performed by Juan. A. (40 N) (100 m) B. (40 N) (100 m) sin 25° C. (40 N) (100 m) cos 25° D. (40 N) (100 m) tan 25° CHAPTER 10 Work, Energy, and Machines Chapter Assessment Reason: When force is applied at an angle, work is equal to the product of force and displacement times the cosine of the angle between the force and the direction of the displacement. That is, W = Fd cos = (40 N) (100 m) cos 25° CHAPTER 10 Work, Energy, and Machines Chapter Assessment Three motors, A, B, and C were tested to lift water from a tank to the top of a building. The results are as follows. Motor A of mass 1.0 kg lifted the water in 120 s. Motor B of mass 1.5 kg lifted the same amount of water in 135 s. Motor C of mass 2.0 kg lifted the same amount of water in 150 s. Which of the motors produced the most power? CHAPTER 10 Work, Energy, and Machines Chapter Assessment A. Motor A B. Motor B C. Motor C D. All three motors produce the same power. CHAPTER 10 Work, Energy, and Machines Chapter Assessment Reason: Power is equal to the work done, divided by the time taken to do work (P = W/t). Since all three motors are doing the same work, the motor doing the work in the least time (that is, Motor A) produces the most power. CHAPTER 10 Work, Energy, and Machines Chapter Assessment While riding a multi-speed bicycle, the muscles in Jack’s body exert a constant force of 400 N. If he covers a distance of 200 m in 1 minute, what is the power delivered by Jack? A. C. B. D. CHAPTER 10 Work, Energy, and Machines Chapter Assessment Reason: Power is equal to the work done, divided by the time taken to do work. Since W = Fd, CHAPTER 10 Work, Energy, and Machines Chapter Assessment John is pushing a huge table in his house. As John pushes the table farther and farther, he applies more and more force. A graph of force (N) applied by John versus the displacement (m) of the table is given. What work does John do on the table? CHAPTER 10 Work, Energy, and Machines Chapter Assessment A. (45 N)(3.0 m) B. -(45 N)(3.0 m) C. D. CHAPTER 10 Work, Energy, and Machines Chapter Assessment Reason: The area under the force-displacement graph is equal to the work done by that force, even if the force changes. Therefore, the work done by John in pushing the table is the area of a triangle: CHAPTER 10 Work, Energy, and Machines Chapter Assessment Explain why the output work of a simple machine can never be greater than the input work. Answer: A simple machine is not a source of energy. It only transfers the energy supplied to it. Therefore, the substance to which a machine transfers energy cannot receive more energy than the amount of energy put into it. Hence, the output work of a simple machine can never be greater than the input work. CHAPTER Work, Energy, and Machines 10 Standardized Test Practice A pulley system consists of two fixed pulleys and two movable pulleys that lift a load that has a weight of 300 N. If the effort force used to lift the load is 100 N, what is the mechanical advantage of the system? A. C. 3 B. D. 6 CHAPTER 10 Work, Energy, and Machines Standardized Test Practice The box in the diagram is being pushed up the ramp with a force of 100.0 N. If the height of the ramp is 3.0 m, what is the work done on the box? (sin 30° = 0.50, cos 30° = 0.87, tan 30° = 0.58) A. 150 J C. 450 J B. 260 J D. 600 J CHAPTER 10 Work, Energy, and Machines Standardized Test Practice A compound machine used to raise heavy boxes consists of a ramp and a pulley. The efficiency of pulling a 100-kg box up the ramp is 50%. If the efficiency of the pulley is 90%, what is the overall efficiency of the compound machine? A. 40% B. 45% C. 50% D. 70% CHAPTER 10 Work, Energy, and Machines Standardized Test Practice A skater with a mass of 50.0 kg slides across an icy pond with negligible friction. As he approaches a friend, both he and his friend hold out their hands, and the friend exerts a force in the direction opposite to the skater’s movement, which lowers the skater’s speed from 2.0 m/s to 1.0 m/s. What is the change in the skater’s kinetic energy? A. 25 J C. 100 J B. 75 J D. 150 J CHAPTER 10 Work, Energy, and Machines Standardized Test Practice A 20.0-N block is attached to the end of a rope, and the rope is looped around a pulley system. If you pull the opposite end of the rope a distance of 2.00 m, the pulley system raises the block a distance of 0.40 m. What is the pulley system’s ideal mechanical advantage? A. 2.5 B. 4.0 C. 5.0 D. 10.0 CHAPTER 10 Work, Energy, and Machines Standardized Test Practice Test-Taking Tip Beat the Clock and then Go Back As you take a practice test, pace yourself to finish each section just a few minutes early so you can go back and check over your work. CHAPTER 10 Work, Energy, and Machines Chapter Resources A Constant Force Exerted on the Backpack CHAPTER 10 Work, Energy, and Machines Chapter Resources Motion of the Planet Around the Sun CHAPTER 10 Work, Energy, and Machines Chapter Resources Constant Force Exerted at an Angle CHAPTER 10 Work, Energy, and Machines Chapter Resources Work Diagram CHAPTER 10 Work, Energy, and Machines Chapter Resources Work and Energy CHAPTER 10 Work, Energy, and Machines Chapter Resources Work Done by a Force CHAPTER 10 Work, Energy, and Machines Chapter Resources Work Done by a Force CHAPTER 10 Work, Energy, and Machines Chapter Resources Maximizing Power on a Multi-speed Bicycle CHAPTER 10 Work, Energy, and Machines Chapter Resources A Pulley System CHAPTER 10 Work, Energy, and Machines Chapter Resources Examples of Simple Machines CHAPTER 10 Work, Energy, and Machines Chapter Resources A Steering Wheel CHAPTER 10 Work, Energy, and Machines Chapter Resources The Human Walking Machine CHAPTER 10 Work, Energy, and Machines Chapter Resources Bicycle Gear Shifters CHAPTER 10 Work, Energy, and Machines Chapter Resources Work and Energy A 105-g hockey puck is sliding across the ice. A player exerts a constant 4.50-N force over a distance of 0.150 m. How much work does the player do on the puck? What is the change in the puck’s energy? CHAPTER 10 Work, Energy, and Machines Chapter Resources Mechanical Advantage You examine the rear wheel on your bicycle. It has a radius of 35.6 cm and has a gear with a radius of 4.00 cm. When the chain is pulled with a force of 155 N, the wheel rim moves 14.0 cm. The efficiency of this part of the bicycle is 95.0 percent. CHAPTER 10 Work, Energy, and Machines Chapter Resources Mechanical Advantage A. What is the IMA of the wheel and gear? B. What is the MA of the wheel and gear? C. What is the resistance force? D. How far was the chain pulled to move the rim 14.0 cm? End of Custom Shows